As already noted, other ways exist for labeling points in the plane. For instance, a point
P may be labeled by its distance r from a central point O ("origin") and the angle f (or Greek φ) which the line OP makes with some standard direction. Such "polar coordinates" (drawing on the left, below) are the ones best suited for describing planetary motion.

The Ellipse in Polar Coordinates

Again, if all the values of (r,f) of a curve are related by some equation which can be symbolically written

r = r(f)

then the function r(f) is said to be the equation of the line, in polar coordinates. The simplest function is a constant number a, giving the line

r = a

The value of r equals a for any value of f. That gives a circle around the origin, its radius equal to a, shown in the drawing on the right above.

The Ellipse

Consider next the curve whose equation is

r = a(1– e2)/(1+ e cos f)

where the eccentricity e is a number between 0 and 1. If e = 0, this is clearly the circle encountered earlier.

How about other values? The function cos f represents a wave-like behavior (picture below), and as f goes through a full circle, it goes down, from +1 to 0, then –1, then up again to 0 and +1. The denominator also rises and falls as a wave, and it is smallest when cos f = –1 . Here is the table of the main values (360 is in parentheses, because it represents the same direction as 0 degrees):

As already noted, other ways exist for labeling points in the plane. For instance, a point
P may be labeled by its distance r from a central point O ("origin") and the angle f (or Greek φ) which the line OP makes with some standard direction. Such "polar coordinates" (drawing on the left, below) are the ones best suited for describing planetary motion.

The Ellipse in Polar Coordinates

Again, if all the values of (r,f) of a curve are related by some equation which can be symbolically written

r = r(f)

then the function r(f) is said to be the equation of the line, in polar coordinates. The simplest function is a constant number a, giving the line

r = a

The value of r equals a for any value of f. That gives a circle around the origin, its radius equal to a, shown in the drawing on the right above.

The Ellipse

Consider next the curve whose equation is

r = a(1– e2)/(1+ e cos f)

where the eccentricity e is a number between 0 and 1. If e = 0, this is clearly the circle encountered earlier.

How about other values? The function cos f represents a wave-like behavior (picture below), and as f goes through a full circle, it goes down, from +1 to 0, then –1, then up again to 0 and +1. The denominator also rises and falls as a wave, and it is smallest when cos f = –1 . Here is the table of the main values (360 is in parentheses, because it represents the same direction as 0 degrees):

f degrees

0

90

180

270

(360)

cos f

1

0

–1

0

1

1 + e cos f

1 + e

1

1 – e

1

1 + e

As long as e is less than 1, the denominator is always positive. It is never zero, so that for any f one can name, one can always find a suitable r. In other words, the curve goes completely around the origin, it is closed.

The expression (1 – e2) can be factored--that is, written as two expressions multiplied by each other ("the product of two expressions"). As discussed in the section on algebraic identities

1 – e2 = (1 – e)(1 + e)

At some of the points on the above table, either (1 – e) or (1 + e) cancels the denominator, giving:

f degrees

0

90

180

270

(360)

r

a(1 – e)

a(1 – e2)

a(1 + e)

a(1 – e2)

a(1 – e)

The distance of the line from the origin thus fluctuates between a(1 – e) and a(1 + e), and the result is a flattened circle or ellipse; the point O (the origin) is its focus. All planetary orbits resemble ellipses, each with its own value of e or eccentricity: the smaller e is, the closer the shape to a circle. The Earth's orbit is very close to a circle, with e = 0.0168, and other major planets (except for Pluto) have comparable eccentricities: if you saw a scale drawing of that orbit on a sheet of paper, your eye would not be able to tell it apart from a circle. The orbit of Comet Halley, on the other hand, has e quite close to 1.

As mentioned in the preceding section a second focus O' can be drawn symmetrical to O, and the ellipse can be defined (its original definition, in fact) as the collection of points for which the sum R1+R2 of their distances from O and O' is always the same

The longest dimension of the ellipse, its width AB along the line connecting the two foci, is its "major axis." Suppose (R1,R2) are the distances of A from the foci O and O'. Then R1 = OA =a(1–e) is the smallest distance of the ellipse from O, R2 = O'A = OB (by symmetry) is the largest and therefore equals a(1 + e). But, OA + OB = AB, hence

AB = a(1 – e) + a(1 + e) = 2a

Hence the quantity a in the equation of the ellipse is known as semi-major axis. We can now state Kepler's law more precisely as "the square of the orbital period T is proportional to the cube of the semi-major axis a of its orbit around the Sun."

The two quantities (a,e) completely define the ellipse. When that ellipse is the orbit of a planet or a satellite, they form two of the six orbital elements which define the state of the orbiting body. A third element, the mean anomaly M, specifies the position of the planet or satellite along the orbit, and the remaining three define the orientation of the orbit in 3-dimensional space. More about the orbital elements can be found in section (12b)

Recently a few such planets have been found, but most are Jupiter-sized and none seems suitable for life. The search, however, goes on, and you can find out about its current status (and much more) on the Planet Quest web site of NASA's Jet Propulsion Lab (JPL). One recent discovery (15 April 1999) has been the system of upsilon Andromeda which appears to contain at least 3 planets. For another recent discovery associated with a distant planet, click here.

Exra-solar planets are discussed in more detail in the next section, which duplicates a few of the paragraphs above.

Bodies in the solar system can also move in other conic sections, in parabolas or hyperbolas, whose equations resemble that of an ellipse, but have e equal to 1 or larger. Properly speaking, these orbits do not have a "semi-major axis," because they are not limited in size like ellipses but extend to infinity. Instead, we must write

r = p/(1 + e cos f)

which doe not raise any problems at e=1. Such bodies are not bound to the Sun, but are free to escape it. The denominator in the equation of the trajectory then becomes zero for some values of f, making its r infinite, and as the moving body approaches those values, it moves further and further away, with no limit. Comets in general have an eccentricity e close to 1, suggesting they have come from the very distant fringes of the solar system. The space probe Voyager 2 has e > 1 and is on its way out of the solar system, never to return.